On p -adic Hurwitz-type Euler zeta functions

“…m (a)) 2 m a(a + 1) · · · (a + m) (4.11) of positive-integer values of the p-adic Euler zeta function of Kim and Hu [20] in terms of generalized harmonic numbers, valid when |a| p > 1 for odd primes p. When p = 2 and a = 1/2 we obtain the expansions…”

The p-adic Arakawa–Kaneko zeta functions and p-adic Lerch transcendent

“…m (a)) 2 m a(a + 1) · · · (a + m) (4.11) of positive-integer values of the p-adic Euler zeta function of Kim and Hu [20] in terms of generalized harmonic numbers, valid when |a| p > 1 for odd primes p. When p = 2 and a = 1/2 we obtain the expansions…”

The p-adic Arakawa–Kaneko zeta functions and p-adic Lerch transcendent

“…Many mathematicians have studied in the area of the Bernoulli numbers, Euler numbers, Genocchi numbers, and tangent numbers see [1][2][3][4][5][6][7][8][9][10][11][12][13][14][15]. The special polynomials of two variables provided new means of analysis for the solution of a wide class of differential equations often encountered in physical problems.…”

Differential Equations Arising from the 3-Variable Hermite Polynomials and Computation of Their Zeros

“…Using software algorithm, researchers can explore theoretical concepts and numerical experiments much more easily than in the past. There have been lots of research by mathematician in different kinds of the Tangent, Euler, Bernoulli, and Genocchi numbers and polynomials (see [1][2][3][4][5][6][7][8][9][10][11][12][13][14][15][16][17]). Numerical developments as well as experiments of Bernoulli polynomials, Euler polynomials, Genocchi polynomials, and Tangent polynomials have been studied with the significant progress in mathematics and computer science as one of the interesting subjects for the development of computer algorithms.…”

Dynamics of the zeros of analytic continued polynomials and differential equations associated with q-tangent polynomials